The selection of the smoothing parameter represents a crucial step in local polynomial regression, due to the implications on the consistency of the non-parametric estimator and to the difficulties in the implementation of the selection procedure. In order to capture the complexity of the unknown regression curve, a local variable bandwidth may be used, but this may increase the variability of the estimates and the computational costs. This paper focuses on the problem of estimating the smoothing parameter adaptively on the support of the function, after evaluating the effective gain in using a local bandwidth rather than a global one
A robust version of local linear regression smoothers augmented with variable bandwidth is studied. ...
We study a robust version of local linear regression smoothers augmented with variable bandwidth. Th...
We suggest an adaptive, error-dependent smoothing method for reducing the variance of local-linear c...
The selection of the smoothing parameter represents a crucial step in local polynomial regression, d...
A decisive question in nonparametric smoothing techniques is the choice of the bandwidth or smoothin...
When estimating a mean regression function and its derivatives, locally weighted least squares regre...
The selection of the smoothing parameter represents a crucial step in the local polynomial regressi...
Local polynomial methods hold considerable promise for boundary estimation, where they offer unmatch...
Local polynomial regression is commonly used for estimating regression functions. In practice, howev...
We propose an adaptive smoothing method for nonparamet- ric regression. The central idea of the pro...
International audienceKernel estimates of a regression operator are investigated when the explanator...
The varying-coefficient model is an attractive alternative to the additive and other models. One imp...
The empirical-bias bandwidth selector (EBBS) is a method for data-driven selection of bandwidths for...
In non-parametric function estimation selection of a smoothing parameter is one of the most importan...
The empirical-bias bandwidth selector (EBBS) is a method for data-driven selection of bandwidths for...
A robust version of local linear regression smoothers augmented with variable bandwidth is studied. ...
We study a robust version of local linear regression smoothers augmented with variable bandwidth. Th...
We suggest an adaptive, error-dependent smoothing method for reducing the variance of local-linear c...
The selection of the smoothing parameter represents a crucial step in local polynomial regression, d...
A decisive question in nonparametric smoothing techniques is the choice of the bandwidth or smoothin...
When estimating a mean regression function and its derivatives, locally weighted least squares regre...
The selection of the smoothing parameter represents a crucial step in the local polynomial regressi...
Local polynomial methods hold considerable promise for boundary estimation, where they offer unmatch...
Local polynomial regression is commonly used for estimating regression functions. In practice, howev...
We propose an adaptive smoothing method for nonparamet- ric regression. The central idea of the pro...
International audienceKernel estimates of a regression operator are investigated when the explanator...
The varying-coefficient model is an attractive alternative to the additive and other models. One imp...
The empirical-bias bandwidth selector (EBBS) is a method for data-driven selection of bandwidths for...
In non-parametric function estimation selection of a smoothing parameter is one of the most importan...
The empirical-bias bandwidth selector (EBBS) is a method for data-driven selection of bandwidths for...
A robust version of local linear regression smoothers augmented with variable bandwidth is studied. ...
We study a robust version of local linear regression smoothers augmented with variable bandwidth. Th...
We suggest an adaptive, error-dependent smoothing method for reducing the variance of local-linear c...